Introduction to Trigonometry

Download Report

Transcript Introduction to Trigonometry

Introduction to
Trigonometry
Right Triangle Trigonometry
This follows the PowerPoint titled: Labeling Right Triangles
Computing
Trigonometric Ratios
See if you can find the link between this presentation
and AA~
Trig Ratios
Trigonometry is all about comparing the
lengths of two sides of a triangle.
 When you compare two numbers, that is a
ratio.

Trig Ratios

Given this triangle, you can make a ratio of
the opposite side and the hypotenuse.
(Angle x is the reference angle.)
10”
6”
x
8”
Trig Ratios
The ratio of opposite side to hypotenuse
is: 6/10 or 0.6.
 Knowing the ratio of two specific sides
can tell you how big angle x is...

10”
6”
x
8”
Trig Ratios
In this case, an opposite/hypotenuse
ratio of 0.6 means that the ref. angle is
36.9 degrees.
 Don’t worry how you get that answer
yet!

10”
6”
x
8”
i.e. You would not have that ratio if the angle was different
Student Activity

In order to participate with the activities
discussed in the next several slides you
will need a protractor and a ruler with a
metric scale (millimeters).
Trig Ratios

To practice writing trig ratios, make a small
table like this:
Ratio:
opp/hyp
adj/hyp
opp/adj
st
nd
rd
1 Triangle 2 Triangle 3 Triangle
Trig Ratios

On a blank piece of paper, make a 6” (or
so) long line. At the left end of this line,
draw a 35 degree angle. Be as precise
as possible!
35°
Trig Ratios

Now measure across 30 mm from the
vertex, then draw a line straight up.
This will form a right triangle.
35°
30 mm
Trig Ratios

Now measure the vertical line and the
hypotenuse in millimeters.
…and the
hypotenuse
Measure this
length...
35°
30 mm
Trig Ratios

With these measurements, fill in the
column under the heading: 1st Triangle.
 Click
to see how this is done…
Trig Ratios

The first box has been filled-in and
computed for you. Finish the two below
it...
st
nd
rd
Ratio:
1 Triangle 2 Triangle 3 Triangle
opp/hyp
21/37 =
0.57
adj/hyp
opp/adj
Trig Ratios
• Hopefully your answers are similar to these:
st
nd
rd
Ratio:
1 Triangle 2 Triangle 3 Triangle
opp/hyp
21/37 =
0.57
adj/hyp
30/37=
0.81
opp/adj
21/30=
0.7
Trig Ratios

Now measure 50 mm from the vertex, and
make a vertical line. As before, measure
the vertical line and hypotenuse.
? mm
35°
50 mm
Trig Ratios

Then fill-in the column headed 2nd
Triangle.
st
nd
rd
Ratio:
1 Triangle 2 Triangle 3 Triangle
opp/hyp
21/37 =
0.57
adj/hyp
30/37=
0.81
opp/adj
21/30=
0.7
Trig Ratios
• Your answers should be close to these:
st
nd
rd
Ratio:
1 Triangle 2 Triangle 3 Triangle
opp/hyp
21/37 =
0.57
35/61=
0.57
adj/hyp
30/37=
0.81
50/61=
0.82
opp/adj
21/30=
0.7
35/50=
0.7
Trig Ratios

Lastly, measure any distance from the
vertex. Create a right triangle, and
measure the vertical line and the
hypotenuse.
35°
Trig Ratios

Fill-in the column 3rd Triangle with your
data: Ratio:
st
nd
rd
1 Triangle 2 Triangle 3 Triangle
opp/hyp
21/37 =
0.57
35/61=
0.57
adj/hyp
30/37=
0.81
50/61=
0.82
opp/adj
21/30=
0.7
35/50=
0.7
Trig Ratios
Now compare your data.
 Due to measurement error, there might be
a few discrepancies when comparing one
column to the next, but not much.
 Your ratios going across a given row
should end up being about the same.

Trig Ratios
Note
Notehow
howall
allof
ofthe
the
opp/hyp
opp/adj
adj/hypratios
ratiosare
are
essentially
essentiallythe
thesame.
same.
st
nd
rd
Ratio:
1 Triangle 2 Triangle 3 Triangle
opp/hyp
21/37 =
0.57
35/61=
0.57
53/92=
0.58
adj/hyp
30/37=
0.81
50/61=
0.82
75/92=
0.82
opp/adj
21/30=
0.7
35/50=
0.7
53/75=
0.7
Trig Ratios
These ratios are unique to a certain angle.
 If you had created a 70° angle, and filledin the three columns as before, your ratios
(such as opp/hyp) would all be the same
but the value would be different. It would
be unique to a 70° degree angle.

Student Activity
 Draw
a 75° angle.
 Create any three right triangles you want from
it. (Just like you did with the 35° angle.)
 Fill in a chart just like you did for the last
problem and compute the ratios.
More on trig ratios

In a perfect world the results for your second
table, the 75° angle, should look like this:
Ratio:
1 Triangle 2 Triangle 3 Triangle
st
nd
rd
opp/hyp
.966
.966
.966
adj/hyp
.259
.259
259
opp/adj
3.73
3.73
3.73
Trig Ratios
So what do these results tell you?
 First, every angle has a unique result for
each of these ratios

opp
hyp
adj
hyp
opp
adj
Trig Ratios
• For example, here are the ratios for a 20°
angle:
20°
opp
hyp
0.342
adj
hyp
0.940
opp
adj
0.364
Trig Ratios
• A different angle, say 40°, will have
different ratios:
20°
40°
opp
hyp
0.342
0.643
adj
hyp
0.940
0.766
opp
adj
0.364
0.839
Trig Ratios
The other thing to remember is that for a
given angle, the size of the triangle you
are working with is irrelevant to how the
ratios turn out.
Trig Ratios

To illustrate this, the angle below (20°) is drawn, then
several right triangles are formed. In each triangle the
ratio of opp/hyp is the same no matter the size of the
triangle.
opp/hyp= 1.82/5.32
5.32
20°
1.82
= .342
Trig Ratios

To illustrate this, the angle below (20°) is drawn, then
several right triangles are formed. In each triangle
the ratio of opp/hyp is the same no matter the size of
the triangle.
opp/hyp= 4.37/12.77 = .342
12.77
20°
4.37
Trig Ratios

To illustrate this, the angle below (20°) is drawn, then
several right triangles are formed. In each triangle
the ratio of opp/hyp is the same no matter the size of
the triangle.
opp/hyp= 6.55/19.16 = .342
19.16
6.55
20°
See if you can find the link between this presentation
and AA~
All Right triangles with a given angle, say 47 degrees, are similar
due to AA~ so the ratios will all be the same